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Learning Long-Term Dependencies in Irregularly-Sampled Time Series

Mathias Lechner, Ramin Hasani

2020Neural Information Processing Systems22 citations

Abstract

Recurrent neural networks (RNNs) with continuous-time hidden states are a natural fit for modeling irregularly-sampled time series. These models, however, face difficulties when the input data possess long-term dependencies. We prove that similar to standard RNNs, the underlying reason for this issue is the vanishing or exploding of the gradient during training. This phenomenon is expressed by the ordinary differential equation (ODE) representation of the hidden state, regardless of the ODE solver's choice. We provide a solution by designing a new algorithm based on the long short-term memory (LSTM) that separates its memory from its time-continuous state. This way, we encode a continuous-time dynamical flow within the RNN, allowing it to respond to inputs arriving at arbitrary time-lags while ensuring a constant error propagation through the memory path. We call these RNN models ODE-LSTMs. We experimentally show that ODE-LSTMs outperform advanced RNN-based counterparts on non-uniformly sampled data with long-term dependencies. All code and data is available at this https URL.

Topics & Concepts

OdeRecurrent neural networkComputer scienceSeries (stratigraphy)Ordinary differential equationSolverTerm (time)Time seriesRepresentation (politics)Code (set theory)AlgorithmSequence (biology)Artificial intelligenceArtificial neural networkApplied mathematicsDifferential equationMachine learningMathematicsBiologyQuantum mechanicsPoliticsPhysicsLawGeneticsPaleontologySet (abstract data type)Programming languageMathematical analysisPolitical scienceModel Reduction and Neural NetworksNeural Networks and ApplicationsTime Series Analysis and Forecasting
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